Market Price Order Quantity Customer Demand Demand Forecast Spot Market 
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  1. [1]
    R. Anupindi and Y. Bassok. Approximations for multiproduct contracts with stochastic demands and business volume discounts: Single supplier case. HE Transactions, 30:723–734, 1998.Google Scholar
  2. [2]
    D. Barnes-Schuster, Y. Bassok, and R. Anupindi. Coordination and flexibility in supply contracts with options. Manufacturing and Service Operations Management, 4:171–207, 2002.CrossRefGoogle Scholar
  3. [3]
    Y. Bassok and R. Anupindi. Analysis of supply contracts with total minimum commitment. HE Transactions, 29:373–382, 1997.Google Scholar
  4. [4]
    P. Bickel and K. Doksum. Mathematical Statisitics:Basic Ideas and Selected Topics. Holden Day Publishers, San Francisco, CA, 1977.Google Scholar
  5. [5]
    A.O. Brown and H.L. Lee. Optimal pay-to-delay capacity reservation with application to the semiconductor industry. Working Paper, Stanford University, Stanford, CA, 1997.Google Scholar
  6. [6]
    L. Brumelle and R. Vickson. A unified approach to stochastic dominance. Stochastic Optimization Models in Finance, W. Ziemba and R. Vickson (editors). Academic Press, New York, 1975.Google Scholar
  7. [7]
    K.L. Donohue. Efficient supply contracts for fashion goods with forecast updating and two production modes. Management Science, 46:1397–1411, 2000.CrossRefGoogle Scholar
  8. [8]
    A. Dvoretzky, J. Kiefer, and J. Wolfowitz. The inventory problem: ii. Case of unknown distributions of demand. Econometrica, 20:450–466, 1952.MathSciNetGoogle Scholar
  9. [9]
    G.D. Eppen and A.V. Iyer. Improved fashion buying with Bayesian updates. Operations Research, 45:805–819, 1997.Google Scholar
  10. [10]
    M. Fisher and A. Raman. Reducing the cost of demand uncertainty through accurate response to early sales. Operations Research, 44:87–99, 1996.Google Scholar
  11. [11]
    G. Gallego and Ö. Özer. Integrating replenishment decisions with advance demand information. Management Science, 47:1344–1360, 2001.CrossRefGoogle Scholar
  12. [12]
    H. Gurnani and C.S. Tang. Note: optimal ordering decisions with uncertain cost and demand forecast updating. Management Science, 45:1456–1462, 1999.Google Scholar
  13. [13]
    W.H. Hausman. Sequential decision problems: A model to exploit existing forecasters. Management Science, 16:B93–B111, 1969.Google Scholar
  14. [14]
    D. Heath and P. Jackson. Modeling the evolution of demand forecast with application to safety stock analysis in production/distribution systems. HE Transactions, 26:17–30, 1994.Google Scholar
  15. [15]
    G.D. Johnson and H. Thompson. Optimality of myopic inventory policies for certain dependent demand processes. Management Science, 21:1303–1307, 1975.MathSciNetCrossRefGoogle Scholar
  16. [16]
    W.S. Lovejoy. Myopic policies for some inventory models with uncertain demand distributions. Management Science, 36:724–738, 1990.zbMATHMathSciNetGoogle Scholar
  17. [17]
    S. Ross. Stochastic Processes. John Wiley, New York, 1983.Google Scholar
  18. [ 18]
    S.P. Sethi and G. Sorger. A theory of rolling horizon decision making. Annals of Operations Research, 29:387–4116, 1991.MathSciNetCrossRefGoogle Scholar
  19. [19]
    S.P. Sethi, H. Yan, and H. Zhang. Peeling layers of an onion: An inventory model with multiple delivery modes and forecast updates. Journal of Optimization Theory and Applications, 108: 253–281, 2001.MathSciNetCrossRefGoogle Scholar
  20. [20]
    S.P. Sethi, H. Yan, and H. Zhang. Inventory models with fixed costs,forecast updates and two delivery modes. Operations Research, 51:321–328, 2003.MathSciNetCrossRefGoogle Scholar
  21. [21]
    S.P. Sethi, H. Yan, and H. Zhang. Quantity-flexibility contracts: Optimal decisions with information updates. Decision Sciences, 35:691–712, 2004.CrossRefGoogle Scholar
  22. [22]
    M. Shaked and J.G. Shanthikumar. Stochastic Orders and Their Applications. Academic Press, New York, 1994.Google Scholar
  23. [23]
    J. Song. The effect of lead time uncertainty in a simple stochastic inventory model. Management Science, 40:603–613, 1994.zbMATHCrossRefGoogle Scholar
  24. [24]
    A. Tsay. The quantity flexibility contract and supplier-customer incentives. Management Science, 45:1339–1358, 1999.Google Scholar
  25. [25]
    A. Tsay and W.S. Lovejoy. Quantity-flexibility contracts and supply chain performance. Manufacturing and Service Operations Management, 1:89–111, 1999.Google Scholar
  26. [26]
    W. Whitt. Uniform conditional variability ordering of probability distributions. Journal of Applied Probability, 22:619–633, 1985.zbMATHMathSciNetCrossRefGoogle Scholar
  27. [27]
    H. Yan, K. Liu, and A. Hsu. Optimal ordering in a dual-supplier system with demand forecast updates. Production and Operations Management, 12:30–45, 2003.CrossRefGoogle Scholar

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